Trigonometric Lie algebras, affine Lie algebras, and vertex algebras

Abstract: In this paper, we explore natural connections among trigonometric Lie algebras, (general) affine Lie algebras, and vertex algebras. Among the main results, we obtain a realization of trigonometric Lie algebras as what were called the covariant algebras of the affine Lie algebra $\widehat{\mathcal{A}}$ of Lie algebra $\mathcal{A}=\frak{gl}{\infty}\oplus\frak{gl}{\infty}$ with respect to certain automorphism groups. We then prove that restricted modules of level $\ell$ for trigonometric Lie algebras naturally correspond to equivariant quasi modules for the affine vertex algebras $V_{\widehat{\mathcal{A}}}(\ell,0)$ (or $V_{\widehat{\mathcal{A}}}(2\ell,0)$). Furthermore, we determine irreducible modules and equivariant quasi modules for simple vertex algebra $L_{\widehat{\mathcal{A}}}(\ell,0)$ with $\ell$ a positive integer. In particular, we prove that every quasi-finite unitary highest weight (irreducible) module of level $\ell$ for type $A$ trigonometric Lie algebra gives rise to an irreducible equivariant quasi $L_{\widehat{\mathcal{A}}}(\ell,0)$-module.